Cookies ussage consent
Our site saves small pieces of text information (cookies) on your device in order to deliver better content and for statistical purposes. You can disable the usage of cookies by changing the settings of your browser. By browsing our site without changing the browser settings you grant us permission to store that information on your device.
I agree, do not show this message again.Computing topological polynomials of certain nanostructures
A. Q. BAIG1,* , M. IMRAN2, H. ALI1, S. U. REHMAN1
Affiliation
- Department of Mathematics, COMSATS Institute of Information Technology, Attock, Pakistan
- Department of Mathematics, School of Natural Sciences (SNS), National University of Sciences and Technology (NUST), Sector H-12, Islamabad, Pakistan
Abstract
Counting polynomials are those polynomials having at exponent the extent of a property partition and coefficients the multiplicity/occurrence of the corresponding partition. In this paper, Omega, Sadhana and PI polynomials are computed for Multilayer Hex-Cells nanotubes, One Pentagonal Carbon nanocones and Melem Chain nanotubes. These polynomials were proposed on the ground of quasi-orthogonal cuts edge strips in polycyclic graphs. These counting polynomials are useful in the topological description of bipartite structures as well as in counting some single number descriptors, i.e. topological indices. These polynomials count equidistant and non-equidistant edges in graphs. In this paper, analytical closed formulas of these polynomials for Multi-layer Hex-Cells MLH (k, d) nanotubes, One Pentagonal Carbon CNC5 (n) nanocones and Melem Chain MC (n) nanotubes are derived..
Keywords
Counting polynomial, Omega polynomial, Sadhana polynomial, PI polynomial, MLH (k, d) nanotubes, CNC5 (n) nanocones, MC (n) nanotubes.
Submitted at: March 2, 2015
Accepted at: May 7, 2015
Citation
A. Q. BAIG, M. IMRAN, H. ALI, S. U. REHMAN, Computing topological polynomials of certain nanostructures, Journal of Optoelectronics and Advanced Materials Vol. 17, Iss. 5-6, pp. 877-883 (2015)
- Download Fulltext
- Downloads: 315 (from 189 distinct Internet Addresses ).